Lacunary formal power series and the Stern-Brocot sequence

Abstract

Let F(X) = Σn ≥ 0 (-1)n X-λn be a real lacunary formal power series, where n = 0, 1 and λn+1/λn > 2. It is known that the denominators Qn(X) of the convergents of its continued fraction expansion are polynomials with coefficients 0, 1, and that the number of nonzero terms in Qn(X) is the nth term of the Stern-Brocot sequence. We show that replacing the index n by any 2-adic integer ω makes sense. We prove that Qω(X) is a polynomial if and only if ω ∈ Z. In all the other cases Qω(X) is an infinite formal power series, the algebraic properties of which we discuss in the special case λn = 2n+1 - 1.